Epimorphisms and Boundary Slopes of 2-Bridge Knots

Abstract

In this article we study a partial ordering on knots in the 3-sphere where K1 is greater than or equal to K2 if there is an epimorphism from the knot group of K1 onto the knot group of K2 which preserves peripheral structure. If K1 is a 2-bridge knot and K1 > K2, then it is known that K2 must also be 2-bridge. Furthermore, Ohtsuki, Riley, and Sakuma give a construction which, for a given 2-bridge knot Kp/q, produces infinitely 2-bridge knots Kp'/q' with Kp'/q'>Kp/q. After characterizing all 2-bridge knots with 4 or less distinct boundary slopes, we use this to prove that in any such pair, Kp'/q' is either a torus knot or has 5 or more distinct boundary slopes. We also prove that 2-bridge knots with exactly 3 distinct boundary slopes are minimal with respect to the partial ordering. This result provides some evidence for the conjecture that all pairs of 2-bridge knots with Kp'/q'>Kp/q arise from the Ohtsuki-Riley-Sakuma construction.